Hint: the first coordinate of the image point (2m,m-n) is always even. What happens if s is odd?

Sounds like a bad answer in the book. It happens (I briefly edited text books, there's tons of problems). The question "Is normality reasonable?" is a good one, but not an easy one. And the assumption ...

I think you have almost solved it. \mathbb{E}( ||X\epsilon||^2_2 ) = \mathbb{E}[ \mathrm{Tr} ( X \epsilon \epsilon^H X^H) ] = \mathrm{Tr} [ \mathbb{E} ( X \epsilon \epsilon^H X^H)] since trace and ...

(1): Note that \text{Im}(AB)\subset\text{Im}(A). (2): Note that \ker(B)\subset\ker(AB) and use the rank-nullity theorem. (3): Observe that \ker(PA)=\ker(A) and use the rank-nullity ...

Since D is a projection we know that \eqalign{\hbox{rk}(D_n)&=\hbox{Tr}(D_n)=n-\hbox{Tr}(C(C^TC)^{-1}C^T)\cr & =n-\hbox{Tr}((C^TC)^{-1}C^TC) =n-\hbox{Tr}(I_p)=n-p.}

There is an error in your formula when using the trace. The trace of a scalar is of course the scalar itself and because tr(AB) = tr(BA) (even for non-square matrices) you have E(y^{T}Ay) = E(tr(y^{T}Ay)) = E(tr(Ay\,{y^{T}})) ...